论文标题
通过半iPime数字的倒数总和1表示1的新示例
New examples of the representation of 1 by the sum of reciprocals of semiprime numbers
论文作者
论文摘要
1978年,Allan.wm.Johnson通过两个不同质量数的乘积的倒数总和获得了1表示1的示例。他的示例有48个术语[1],我们没有到目前为止少于48个任期的例子。在本文中,我们构建了17个少于48个任期的新示例。由于所有新示例都有47个术语,而且我们没有少于47个术语的示例,因此假定最低条款数为47个。
In 1978, Allan.Wm.Johnson obtained an example of the representation of 1 by the sum of reciprocals of the product of two distinct prime numbers. His example has 48 terms [1], and we had no examples which have less than 48 terms until now. In this paper, we construct 17 new examples that have less than 48 terms. Since all of the new examples have 47 terms and we have no examples which have less than 47 terms, it is assumed that the minimum number of terms is 47.
